Dirichlet-type spaces of the bidisc and Toral 2-isometries

Abstract

We introduce and study Dirichlet-type spaces D(μ1, μ2) of the unit bidisc D2, where μ1, μ2 are finite positive Borel measures on the unit circle. We show that the coordinate functions z1 and z2 are multipliers for D(μ1, μ2) and the complex polynomials are dense in D(μ1, μ2). Further, we obtain the division property and solve Gleason's problem for D(μ1, μ2) over a bidisc centered at the origin. In particular, we show that the commuting pair Mz of the multiplication operators Mz1, Mz2 on D(μ1, μ2) defines a cyclic toral 2-isometry and M*z belongs to the Cowen-Douglas class B1( D2r) for some r >0. Moreover, we formulate a notion of wandering subspace for commuting tuples and use it to obtain a bidisc analog of Richter's representation theorem for cyclic analytic 2-isometries. In particular, we show that a cyclic analytic toral 2-isometric pair T with cyclic vector f0 is unitarily equivalent to Mz on D(μ1, μ2) if and only if T*, spanned by f0, is a wandering subspace for T.